On the existence of impurity bound excitons in one-dimensional systems with zero range interactions

Abstract

We consider a three-body one-dimensional Schr\"odinger operator with zero range potentials, which models a positive impurity with charge > 0 interacting with an exciton. We study the existence of discrete eigenvalues as is varied. On one hand, we show that for sufficiently small there exists a unique bound state whose binding energy behaves like 4, and we explicitly compute its leading coefficient. On the other hand, if is larger than some critical value then the system has no bound states.